Content deleted Content added
Fix Linter errors. |
|||
| (28 intermediate revisions by 14 users not shown) | |||
Line 1:
{{Short description|Geometric theorem involving midpoints on a triangle}}
[[File:Midpoint theorem.svg|thumb|upright=1.25|<math> \begin{align} &\text{D and E
The '''midpoint theorem''', '''midsegment theorem''', or '''midline theorem''' states that if the midpoints of two sides of a triangle are connected, then the resulting line segment will be parallel to the third side and have half of its length. The midpoint theorem generalizes to the [[intercept theorem]], where rather than using midpoints, both sides are partitioned in the same ratio.<ref>{{Cite book |last=Clapham |first=Christopher |title=The concise Oxford dictionary of mathematics: clear definitions of even the most complex mathematical terms and concepts |last2=Nicholson |first2=James |date=2009 |publisher=Oxford Univ. Press |isbn=978-0-19-923594-0 |edition=4th |series=Oxford paperback reference |___location=Oxford |pages=297}}</ref><ref>{{Cite book |last=French |first=Doug |title=Teaching and learning geometry: issues and methods in mathematical education |date=2004 |publisher=Continuum |isbn=978-0-8264-7362-2 |___location=London; New York |pages=81–84 |oclc=ocm56658329}}</ref>
The converse of the theorem is true as well. That is if
The triangle formed by the three parallel lines through the three midpoints of sides of a triangle is called its [[medial triangle]].
==Proof==
===Proof by construction===
{{Math proof|proof=[[File:Midpoint Theorem proof.png|thumb|304x304px]]
'''Given''': In a <math>\triangle ABC </math> the points M and N are the midpoints of the sides AB and AC respectively.
'''[[Geometric Construction|Construction]]''': MN is extended to D where MN=DN, join C to D.
'''To Prove''':
*<math>MN\parallel BC</math>
*<math>MN={1\over 2}BC</math>
'''Proof''':
*<math>AN=CN</math> (given)
*<math>\angle ANM=\angle CND</math> (vertically opposite angle)
*<math>MN=DN</math> (constructible)
Hence by [[Side angle side]].
:<math>\triangle AMN\cong\triangle CDN </math>
Therefore, the corresponding sides and angles of congruent triangles are equal
*<math>AM=BM=CD</math>
*<math>\angle MAN=\angle DCN</math>
[[Transversal (geometry)|Transversal]] AC intersects the lines AB and CD and alternate angles ∠MAN and ∠DCN are equal. Therefore
*<math>AM\parallel CD\parallel BM</math>
Hence BCDM is a [[parallelogram]]. BC and DM are also equal and parallel.
*<math>MN\parallel BC</math>
*<math>MN={1\over 2}MD={1\over 2}BC</math>,
[[Q.E.D.]]
}}
===Proof by similar triangles===
{{Math proof|proof=[[File:Midpoint theorem.svg|thumb|304x304px]]
Let D and E be the midpoints of AC and BC.
'''To prove:'''
* <math>DE\parallel AB</math>,
* <math>DE = \frac{1}{2}AB</math>.
'''Proof:'''
<math>\angle C</math> is the common angle of <math>\triangle ABC</math> and <math>\triangle DEC</math>.
Since DE connects the midpoints of AC and BC, <math>AD=DC</math>, <math>BE=EC</math> and <math>\frac{AC}{DC}=\frac{BC}{EC}=2.</math> As such, <math>\triangle ABC</math> and <math>\triangle DEC</math> are [[Similarity (geometry)|similar]] by the SAS criterion.
Therefore, <math>\frac{AB}{DE}=\frac{AC}{DC}=\frac{BC}{EC}=2,</math> which means that <math>DE=\frac{1}{2}AB.</math>
Since <math>\triangle ABC</math> and <math>\triangle DEC</math> are similar and <math>\triangle DEC \in \triangle ABC</math>, <math>\angle CDE = \angle CAB</math>, which means that <math>AB\parallel DE</math>.
[[Q.E.D.]]
}}
==See also==
* [[Median of the trapezoid theorem]]
==References==
{{reflist}}
==External links ==
*[http://math.fau.edu/yiu/Oldwebsites/MSTHM2014/Supplement0627.pdf ''The
*[https://www.edumple.com/cbse-class-9/mathmatics/motivate-in-a-parallelogram-the-diagonals-bisect-each-other-and-conversely/notes/saira_2419 The Mid-Point Theorem
*[https://www.youtube.com/watch?v=Q457DRC33zY ''Midpoint theorem and converse Euclidean explained Grade 10+12 ''] (video, 5:28 mins)
*[https://proofwiki.org/wiki/Midline_Theorem ''midpoint theorem''] at the Proof Wiki
[[Category:Theorems about triangles]]
| |||